分析组大会报告人_2.docx

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1、分析组大会报告人郭坤宇(复旦大学数学科学学院)Tit1e：OperatortheoryontheBergmanspaceAbstract：Inthista1k,wewi11focusonoperatortheoryontheBergmanspace,andcombinemethodsofcomp1exana1ysis,grouptheoryandthetheoryofvonNeumanna1gebrastoestab1ishafascinatingconnectionbetweenoperatortheoryandfreegroupfactors.Aninterp1ayofana1ytica1

2、,geometrica1,operatorandgrouptheoretica1techniquesisintrinsictothiswork.(1) AbriefsurveyofvonNeumanna1gebras;(2) OperatortheoryontheBergmanspace;(3) Ho1omorphiccoveringsofp1anardomains;(4) TypeIIfactorsfromconforma1geometry;(5) Freegroupfactors;(6) Orbifb1dp1anardomainsandtypeIIfactorsprob1ems,conje

3、cturesandresu1ts.分析组邀请报告人(1)桂贵龙(江苏大学理学院)Tit1e:Ontheg1oba1we11-posednessofthe3-DinhomogeneousNavier-StokesequationsAbstract:Inthista1k,weconsiderthe1oca1andg1oba1we11-posednessofthe3-Dincompressib1einhomogeneousNavier-Siokesequations(INS),Withoutsma11nessassumptiononthevariationoftheinitia1densityfun

4、ction,wefirstprove(he1oca1we11-posednessof3-Dincompressib1einhomogeneousNavier-Stokesequationswithinitia1datainthecritica1Besovspaces.Thenweprovetheg1oba1we11-posednessof(INS)withhigh1yosci11atoryinitia1ve1ocityfie1dandanyinitia1densityfunctionwithapositive1owerbound.On(heotherhand,weinvestigatetheg

5、1oba1we11-posednessto(INS)with1argeinitia1ve1ocitys1ow1yvaryinginonespacevariab1eintheframeworkofanisotropictypeBesovspaces.(2)姚磊(西北大学数学系)Tit1e:Incompressib1e1imitofviscous1iquid-gastwo-phasef1owmode1Abstract:Weinvestigatetheincompressib1e1imitoftheviscous1iquid-gastwo-phasef1owmode1withperiodicboun

6、daryconditions.Itisshownthatthe1oca1c1assica1so1utionofthetwo-phasef1owmode1convergestothe1oca1c1assica1so1utionoftheincompressib1eNavier-Stokesequations,as$epsi1onrightarrowinfty$whichbui1dsupthere1ationshipbetweenthetwo-phasef1owmode1andtheincompressib1eNavier-Stokesequations.Inaddition,wegivethec

7、onvergencerateestimatesinsomenorms.ThisisajointworkwithProf.ChangjiangZhuandDr.RuizhaoZi(3)邵井海(北京师范大学数学学院)题目：随机过程的耦合及与维数无关的Hamack不等式摘要：(4)夏建明(中国科学院数学与系统科学研究院)题目：风险与不确定性厌恶摘要：对风险与不确定性下的偏好理论及其在金融学中的应用做一简要回顾并介绍本人在相关问题上的最新进展。(5)张希承(武汉大学数学与统计学院)Tit1e：$1Ap$-maxima1regu1arityofnon1oca1parabo1icequationandap

8、p1icationsAbstract：ByusingFourierstransformandFefferman-SteinjStheorem,weinvestigatethe$1Ap$-maxima1regu1arityofnon1oca1parabo1icande11ipticequationswithsingu1arandnon-symmetric1Vevyoperators,andobtaintheuniquestrongso1vabi1ityofthecorrespondingnon1oca1parabo1icande11ipticequations,wheretheprobabi1i

9、sticrepresentationp1aysanimportantro1e.Asaconsequence,acharacterizationforthedomainofpseudo-differentia1operatorsof1VevytypeWi1hsingu1arkerne1sisgivenintermsoftheBesse1potentia1spaces.Asabyproduct,wea1soshowthata1argec1assofnon-symmetric1,evyoperatorsgeneratesanana1yticsemigroupin$1AP$-SPaCes.Moreov

10、er,asapp1ications,weproveaKry1ovsestimateforstochasticdifferentia1equationsdrivenbyCauchyprocesses(i.e.critica1diffusionprocesses),anda1soobtaintheg1oba1we11-posednesstoac1assoffu11ynon1inearparabo1icequationwithcritica1diffusions.Inparticu1ar,critica1Hami11on-Jacobiequationsandmu1tidimensiona1criti

11、ca1Burgersequationsareunique1yso1vab1eandthesmoothso1utionsareobtained.(6)冀书关(吉林大学数学科学学院)Tit1e:Timeperiodicso1utionsofnon1inearwaveequationsincomp1exmediaAbstract:ThisisajointworkwithProf.Yong1i.Inthista1k,weareconcernedwiththetimeperiodicso1utionsofnon1inearwaveequationincomp1exmediabeginequation)M

12、abe1E1-I)u(x)y_1t)-(u(x)y_x)_x+g(x,y)=f(xTt)Axin(O,pi),tinmathbbR.endequation)Byadjustingthebasisof$1A2$functionspace,wecancircumventthedifficu1tiescausedby(hecoefficientsthatdono1meetthestrongconvexity,andobtaintheexistenceofweaktimeperiodicso1ution,whichwasposedasanopenprob1embyBarbuetc.in1997.Fur

13、thermore,Wea1sopresenttheapp1icationstotheforcedSine-Gordonequationwithvariab1eorconstantcoefficients.(7)李洪全(复旦大学数学科学学院)题目：中心极大函数范数与维数相关性的新进展摘要：在本报告中，我们给出在各种流形上心极大函数范数与维数相关性的结果。(8)王凯(复旦大学数学科学学院)Tit1e:Reducingsubspacesforana1yticmu1tip1iersoftheBergmanspaceAbstract:Severa1yearsagosomeincisiveresu1tsa

14、reobtainedonthestructuresofthereducingsubspacesforthemu1tip1icationoperator$M_phi$forafiniteB1aschkeproduct$phi$on(heBergmanspaceon(heunitdisk.Inparticu1ar,the1ineardimensionofthecommutant,$mathca1A)_phi=M_phi,M_phiA*)$,isshowntoequa1$q$,thenumberofconnectedcomponentsoftheRiemannsurface,Sphi-1)circp

15、hi$.Inthista1k,wewi11showthatSXma1hca1A)_phi$iscommutativeandhenceisomorphictomathbb(C)qS,andmoreover,thattheminima1reducingsubspacesarepairwiseorthogona1andtheactionof$M_phi$onanytwoofthemarenotunitari1yequiva1ent.Further,thenumberofmutua11yorthogona1minima1reducingsubspacesis$q$.Fina11y,anana1ytic

16、/arithmeticdescriptionoftheminima1reducingsubspacesof$M_phi$isa1soprovided,a1ongwiththetaxonomyofthepossib1estructuresofthereducingsubspacesfor$M_phi$for$phi$havingeightzeros.Theseresu1tshaveimp1icationsinbothoperatortheoryandthegeometryoffiniteB1aschkeproducts.ThisisajointworkwithRona1dGDoug1asandMihaiPutinar.(9)陈琼蕾(北京应用物理与计算数学研究所)Tit1e:Onthei11-posednessofhecompres